Tangent Flows of K\"ahler Metric Flows

Abstract

We improve the description of F-limits of noncollapsed Ricci flows in the K\"ahler setting. In particular, the singular strata Sk of such metric flows satisfy S2j=S2j+1. We also prove an analogous result for quantitative strata, and show that any tangent flow admits a nontrivial one-parameter action by isometries, which is locally free on the cone link in the static case. The main results are established using parabolic regularizations of conjugate heat kernel potential functions based at almost-selfsimilar points, which may be of independent interest.